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Fig. Q5.17, p.139.

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Presentation on theme: "Fig. Q5.17, p.139."— Presentation transcript:

1 Fig. Q5.17, p.139

2 [UN 5.1] The life-support unit strapped to the back of astronaut Edwin Aldrin weighed 300 lb on the Earth. During his training, a 50-lb mock-up was used. Although this effectively simulated the reduced weight the unit would have on the Moon, it did not correctly mimic the unchanging mass. It was just as difficult to accelerate the unit (perhaps by jumping or twisting suddenly) on the Moon as on the Earth. (Courtesy of NASA) Fig. 5.UN, p.119

3 Figure 5. 1 Some examples of applied forces
Figure 5.1  Some examples of applied forces. In each case a force is exerted on the object within the boxed area. Some agent in the environment external to the boxed area exerts a force on the object. Fig. 5.1, p.113

4 Fig. P5.61, p.147

5 Figure 5. 2 The vector nature of a force is tested with a spring scale
Figure 5.2  The vector nature of a force is tested with a spring scale. (a) A downward force F1 elongates the spring 1.00 cm. (b) A downward force F2 elongates the spring 2.00 cm. (c) When F1 and F2 are applied simultaneously, the spring elongates by 3.00 cm. (d) When F1 is downward and F2 is horizontal, the combination of the two forces elongates the spring √[(1.00 cm)2 + (2.00 cm)2] = 2.24 cm. Fig. 5.2, p.114

6 Table 5.1, p.118

7 Figure 5. 5 Newton’s third law
Figure 5.5  Newton’s third law. (a) The force F12 exerted by object 1 on object 2 is equal in magnitude to and opposite in direction to the force F21 exerted by object 2 on object 1. Fig. 5.5, p.120

8 Figure 5.6  (a) When a computer monitor is at rest on a table, the forces acting on the monitor are the normal force n and the gravitational force Fg. The reaction to n is the force Fmt exerted by the monitor on the table. The reaction to Fg is the force FmE exerted by the monitor on the Earth. (b) The free-body diagram for the monitor. Fig. 5.6, p.121

9 Figure 5.8  (a) A crate being pulled to the right on a frictionless surface. (b) The free-body diagram representing the external forces acting on the crate. Fig. 5.8, p.123

10 Figure 5.9  When one object pushes downward on another object with a force F, the normal force n is greater than the gravitational force: n = Fg + F. Fig. 5.9, p.124

11 Figure 5. 11 (a) A car of mass m sliding down a frictionless incline
Figure (a) A car of mass m sliding down a frictionless incline. (b) The free-body diagram for the car. Note that its acceleration along the incline is g sin Fig. 5.11, p.126

12 Figure (a) A lamp suspended from a ceiling by a chain of negligible mass. (b) The forces acting on the lamp are the gravitational force Fg and the force T exerted by the chain. (c) The forces acting on the chain are the force T’ exerted by the lamp and the force T’’ exerted by the ceiling. Fig. 5.7, p.123

13 Figure 5. 10 (a) A traffic light suspended by cables
Figure (a) A traffic light suspended by cables. (b) Free-body diagram for the traffic light. (c) Free-body diagram for the knot where the three cables are joined. Fig. 5.10, p.124

14 Active Figure 5.12 A force is applied to a block of mass m1, which pushes on a second block of mass m2. Fig. 5.12a, p.127

15 Active Figure 5.12 A force is applied to a block of mass m1, which pushes on a second block of mass m2. (b) The free-body diagram for m1. Fig. 5.12b, p.127

16 Active Figure 5.12 A force is applied to a block of mass m1, which pushes on a second block of mass m2. (c) The free-body diagram for m2. Fig. 5.12c, p.127

17 Figure 5. 13 Apparent weight versus true weight
Figure Apparent weight versus true weight. (a) When the elevator accelerates upward, the spring scale reads a value greater than the weight of the fish. (b) When the elevator accelerates downward, the spring scale reads a value less than the weight of the fish. Fig. 5.13, p.128

18 Active Figure 5. 14 The Atwood machine
Active Figure The Atwood machine. (a) Two objects (m2 > m1) connected by a massless inextensible cord over a frictionless pulley. (b) Free-body diagrams for the two objects. Fig. 5.14, p.129

19 Figure 5.15  (a) Two objects connected by a lightweight cord strung over a frictionless pulley.
Fig. 5.15a, p.130

20 Figure 5.15  (b) Free-body diagram for the ball.
Fig. 5.15b, p.130

21 Figure 5. 15 (c) Free-body diagram for the block
Figure 5.15  (c) Free-body diagram for the block. (The incline is frictionless.) Fig. 5.15c, p.130

22

23 Fig. P5.45, p.145

24 Fig. P5.51, p.145

25 Fig. P5.55, p.146

26 Active Figure 5.16   The direction of the force of friction f between a trash can and a rough surface is opposite the direction of the applied force F. Because both surfaces are rough, contact is made only at a few points, as illustrated in the “magnified” view. (a) For small applied forces, the magnitude of the force of static friction equals the magnitude of the applied force. (b) When the magnitude of the applied force exceeds the magnitude of the maximum force of static friction, the trash can breaks free. The applied force is now larger than the force of kinetic friction and the trash can accelerates to the right. (c) A graph of friction force versus applied force. Note that fs,max > fk. At the Active Figures link at you can vary the load in the trash can and practice sliding it on surfaces of varying roughness. Note the effect on the trash can’s motion and the corresponding behavior of the graph in (c). Fig. 5.16, p.131

27 Table 5.2, p.132

28

29 Table 5.4, p.137

30 Figure (a) The external force F applied as shown can cause the block to accelerate to the right. Fig. 5.21a, p.136

31 Figure 5.21 (b) and (c) The free-body diagrams assuming that the block accelerates to the right and the ball accelerates upward. The magnitude of the force of kinetic friction in this case is given by fk = μkn = μk(m1g – F sin θ). Fig. 5.21b, p.136

32 Figure 5.21 (b) and (c) The free-body diagrams assuming that the block accelerates to the right and the ball accelerates upward. The magnitude of the force of kinetic friction in this case is given by fk = μkn = μk(m1g – F sin θ). Fig. 5.21c, p.136

33 Figure After the puck is given an initial velocity to the right, the only external forces acting on it are the gravitational force mg, the normal force n, and the force of kinetic friction fk. Fig. 5.20, p.135

34 Figure 5.18 (Conceptual Example 5.11)
Fig. 5.18, p.134

35 Table 5.3, p.137

36 Fig. P5.21, p.141

37 Fig. P5.34, p.143

38 Fig. P5.58, p.146

39 Fig. P5.61, p.147


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